Assume that a procedure yields a binomial distribution with n = 8 trials and a probability of success of p=0.60. Use a binomial probability table to find the probability that the number of successes x is exactly 1.Click on the icon to view the binomial probabilities table.P(1) = (Round to three decimal places as needed.)Binomial Probabilities TableD2345678X0120123012340123450123456011234567012Binomial Probabilities.01.9500200+.9700290+0+0+.961.039man.0010+0+.951048.0010+0+D0+.941057.0010+0+210+010+...932.0660020+0+0+2.0+0+.923075003.05.902.10.810.095 .180.002.010.857.135.0070+.815.171.0140+0+.774.204.021.0010+2.0+.735.232.0310020+0+0+0+.698.257.041.0040+0+0+0+.663279.051.729.243.027001.001.590.328.073.0080+0+.656.292.049.004 .0260+.0020+0+.20.640.320.040.478.372.124.023.0030+0+0+.531.262.354.393.098.246.015 .082.001.015D.0020+430.383.149.512.384.096008.008410.240.410.412154.154 .265.076.008.328.410.205.051.0060+.210.367.275.115.029.0040+0+.30.490.420.090.168.336.294.343.441.189.027.028.002.118.303.324.185.060.010.001c.082.247.318.227.097.025.0040+.40360.130246.346.346.154.026.168 .078.031.259 .156.360.309.346.312.132 .230.312.077.156.010.031.058.198.296.480160.216 .125.432.375.288.375.064 .125.047.187.311.276.138CAT.037.004.50.250.500250.028.131.261.290.194077.017.002.017.090.209.0622503.75.375.250.062.016.094.234.312.234.094.016.006.055.164.273.273.164.055.008.004.031.109P.60.160480360064288....432216216028AZA.1543346346.130010.0772017230346259078078037.13827631140.187047.....002017077.194290261.131028....001.008041.70090420490027.189441242343008076265412240.002028.132309360.168.001010060.185324..303.1180+00402509722731824708280040320640008096384512002026.1544104100+.0060512054103280+002015052246..3932620+0+004029.1152753672100+0+.0010+010 .001.90010.180.810.001027243.7290+004049292.6560+0+0050733285900+0+0010150983545310+0+0+003023.1243724780+0+0+95.002095.9020+.007.1358570+D.0+014.171.815we0+0+.001021204774.7740+0+0+002031232.7350+0+0+0+0040412576980+010+0+.990+.020.9800+0+.029070.9700+0+.001.0399610+0+0+.001.048.9510+0+0+0+.001.057.9410+0+0+0+0+.002.066.9320+0+0+X01201230122J 3401234E5012345C0 6012345670+12n23457

Answered: Image /qna-images/answer/0cc0ffa1-62be-41ed-9f11-66cc91bbf508.jpg

Assume that a procedure yields a binomial distribution with n = 8 trials and a probability of success of p=0.60. Use a binomial probability table to find the probability that the number of successes x is exactly 1.

Assume that a procedure yields a binomial distribution with n = 8 trials and a probability of success of p=0.60. Use a binomial probability table to find the probability that the number of successes x is exactly 1.

College Algebra

7th Edition

ISBN:9781305115545

Author:James Stewart, Lothar Redlin, Saleem Watson

Publisher:James Stewart, Lothar Redlin, Saleem Watson

Chapter9: Counting And Probability

Section9.3: Binomial Probability

Problem 2E: If a binomial experiment has probability p success, then the probability of failure is...

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Question

Assume that a procedure yields a binomial distribution with n = 8 trials and a probability of success of p=0.60. Use a binomial probability table to find the probability that the number of successes x is exactly 1.
Click on the icon to view the binomial probabilities table.
P(1) = (Round to three decimal places as needed.)
Binomial Probabilities Table
D
2
3
4
5
6
7
8
X
0
1
2
0
1
2
3
0
1
2
3
4
0
1
2
3
4
5
0
1
2
3
4
5
6
0
1
1
2
3
4
5
6
7
0
1
2
Binomial Probabilities
.01
.950
020
0+
.970
029
0+
0+
0+
.961
.039
man
.001
0+
0+
.951
048
.001
0+
0+
D
0+
.941
057
.001
0+
0+
21
0+
01
0+
..
.932
.066
002
0+
0+
0+
2.
0+
0+
.923
075
003
.05
.902
.10
.810
.095 .180
.002
.010
.857
.135
.007
0+
.815
.171
.014
0+
0+
.774
.204
.021
.001
0+
2.
0+
.735
.232
.031
002
0+
0+
0+
0+
.698
.257
.041
.004
0+
0+
0+
0+
.663
279
.051
.729
.243
.027
001
.001
.590
.328
.073
.008
0+
0+
.656
.292
.049
.004 .026
0+
.002
0+
0+
.20
.640
.320
.040
.478
.372
.124
.023
.003
0+
0+
0+
.531
.262
.354
.393
.098
.246
.015 .082
.001
.015
D
.002
0+
430
.383
.149
.512
.384
.096
008
.008
410
.240
.410
.412
154
.154 .265
.076
.008
.328
.410
.205
.051
.006
0+
.210
.367
.275
.115
.029
.004
0+
0+
.30
.490
.420
.090
.168
.336
.294
.343
.441
.189
.027
.028
.002
.118
.303
.324
.185
.060
.010
.001
c
.082
.247
.318
.227
.097
.025
.004
0+
.40
360
.130
246
.346
.346
.154
.026
.168 .078
.031
.259 .156
.360
.309
.346
.312
.132 .230
.312
.077
.156
.010
.031
.058
.198
.296
.480
160
.216 .125
.432
.375
.288
.375
.064 .125
.047
.187
.311
.276
.138
CAT
.037
.004
.50
.250
.500
250
.028
.131
.261
.290
.194
077
.017
.002
.017
.090
.209
.062
250
3.75
.375
.250
.062
.016
.094
.234
.312
.234
.094
.016
.006
.055
.164
.273
.273
.164
.055
.008
.004
.031
.109
P
.60
.160
480
360
064
288
....
432
216
216
028
AZA
.154
3346
346
.130
010
.077
2017
230
346
259
078
078
037
.138
276
311
40
.187
047
.....
002
017
077
.194
290
261
.131
028
...
.001
.008
041
.70
090
420
490
027
.189
441
242
343
008
076
265
412
240
.002
028
.132
309
360
.168
.001
010
060
.185
324
..
303
.118
0+
004
025
097
227
318
247
082
80
040
320
640
008
096
384
512
002
026
.154
410
410
0+
.006
051
205
410
328
0+
002
015
052
246
..
393
262
0+
0+
004
029
.115
275
367
210
0+
0+
.001
0+
010 .001
.90
010
.180
.810
.001
027
243
.729
0+
004
049
292
.656
0+
0+
005
073
328
590
0+
0+
001
015
098
354
531
0+
0+
0+
003
023
.124
372
478
0+
0+
0+
95
.002
095
.902
0+
.007
.135
857
0+
D.
0+
014
.171
.815
we
0+
0+
.001
021
204
774
.774
0+
0+
0+
002
031
232
.735
0+
0+
0+
0+
004
041
257
698
0+
01
0+
0+
.99
0+
.020
.980
0+
0+
.029
070
.970
0+
0+
.001
.039
961
0+
0+
0+
.001
.048
.951
0+
0+
0+
0+
.001
.057
.941
0+
0+
0+
0+
0+
.002
.066
.932
0+
0+
0+
X
0
1
2
0
1
2
3
0
1
2
2
J 3
4
0
1
2
3
4
E
5
0
1
2
3
4
5
C
0 6
0
1
2
3
4
5
6
7
0
+
1
2
n
2
3
4
5
7

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